[see also: retrieve]
If we know a covering space $E$ of $X$ then not only do we know that ......, but we can also recover $X$ (up to homeomorphism) as $E/G$.
Thus $F$ can be recovered from $X^{k}F$ by $k$-fold integration.
Replacing $f$ by log $f$, we recover the theorem of [6].
This is nearly the same as formula (6) of [7], which we can recover by multiplying (2.3) by $F(s)$.
To recover Wiener's famous result that Brownian paths are continuous, one needs to use more sophisticated reasoning.
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